Sharp concentration estimates near criticality for radial sign-changing solutions of Dirichlet and Neumann problems

Abstract

We consider radial solutions of the slightly subcritical problem - u = |u|4n-2-u either on Rn (n≥ 3) or in a ball B satisfying Dirichlet or Neumann boundary conditions. In particular, we provide sharp rates and constants describing the asymptotic behavior (as 0) of all local minima and maxima of u as well as its derivative at roots. Our proof is done by induction and uses energy estimates, blow-up/normalization techniques, a radial pointwise Pohozaev identity, and some ODE arguments. As corollaries, we complement a known asymptotic approximation of the Dirichlet nodal solution in terms of a tower of bubbles and present a similar formula for the Neumann problem.